Locally adapted meshes and polynomial degrees can greatly improve spectral element accuracy and applicability. A balancing domain decomposition by constraints (BDDC) preconditioner is constructed and analysed for both continuous (CG) and discontinuous (DG) Galerkin discretizations of scalar elliptic problems, built by nodal spectral elements with variable polynomial degrees. The DG case is reduced to the CG case via the auxiliary space method. The proposed BDDC preconditioner is proved to be scalable in the number of subdomains and quasi-optimal in both the ratio of local polynomial degrees and element sizes and the ratio of subdomain and element sizes. Several numerical experiments in the plane confirm the obtained theoretical convergence ...
Hybridizable Discontinuous Galerkin (HDG) is an important family of methods, which combine the advan...
Discontinuous Galerkin (DG) methods offer an enormous flexibility regarding local grid refinement an...
The Virtual Element Method (VEM) is a recent numerical technology for the solution of partial differ...
This paper is concerned with the design, analysis and implementation of preconditioning concepts for...
Discontinuous Galerkin (DG) methods offer a very powerful discretization tool because they not only ...
Abstract This paper is concerned with the design, analysis and implementation of preconditioning con...
Two of the most recent and important nonoverlapping domain decomposition methods, the BDDC method (B...
The discrete systems generated by spectral or hp-version finite elements are much more ill-condition...
A Balancing Domain Decomposition by Constraints (BDDC) preconditioner for Isogeometric Analysis of s...
In this article we address the question of efficiently solving the algebraic linear system of equati...
International audienceIn this article, we consider the derivation of hp–optimal spectral bounds for ...
Domain decomposition preconditioners fur high-order Galerkin methods in two dimensions are often bui...
Abstract. We analyse the spectral bounds of nonoverlapping domain decomposition precondi-tioners for...
In recent years, domain decomposition (DD) techniques have been extensively used to solve efficientl...
In this article we address the question of efficiently solving the algebraic linear system of equati...
Hybridizable Discontinuous Galerkin (HDG) is an important family of methods, which combine the advan...
Discontinuous Galerkin (DG) methods offer an enormous flexibility regarding local grid refinement an...
The Virtual Element Method (VEM) is a recent numerical technology for the solution of partial differ...
This paper is concerned with the design, analysis and implementation of preconditioning concepts for...
Discontinuous Galerkin (DG) methods offer a very powerful discretization tool because they not only ...
Abstract This paper is concerned with the design, analysis and implementation of preconditioning con...
Two of the most recent and important nonoverlapping domain decomposition methods, the BDDC method (B...
The discrete systems generated by spectral or hp-version finite elements are much more ill-condition...
A Balancing Domain Decomposition by Constraints (BDDC) preconditioner for Isogeometric Analysis of s...
In this article we address the question of efficiently solving the algebraic linear system of equati...
International audienceIn this article, we consider the derivation of hp–optimal spectral bounds for ...
Domain decomposition preconditioners fur high-order Galerkin methods in two dimensions are often bui...
Abstract. We analyse the spectral bounds of nonoverlapping domain decomposition precondi-tioners for...
In recent years, domain decomposition (DD) techniques have been extensively used to solve efficientl...
In this article we address the question of efficiently solving the algebraic linear system of equati...
Hybridizable Discontinuous Galerkin (HDG) is an important family of methods, which combine the advan...
Discontinuous Galerkin (DG) methods offer an enormous flexibility regarding local grid refinement an...
The Virtual Element Method (VEM) is a recent numerical technology for the solution of partial differ...